Let X~Geometric(1/3) and let Y=|X-5|. Find the range and PMF of Y. Starting with the equation...

SOLUTION REQUIRED WITH COMPLETE STEPS Let X and Y be discrete random variables, their joint pmf...

SOLUTION REQUIRED WITH COMPLETE STEPS Let X and Y be discrete random variables, their joint pmf is given as Px,y = ?(? + ?)/(B + 1) for 0 < X ≤ 3, 0 < Y ≤ 3 (Where B=5) a) Find the value of ? b) Find the marginal pmf of ? and ? c) Find conditional pmf of ? given ? = 2

Let X and Y be discrete random variables, their joint pmf is given as Px,y =...

Let X and Y be discrete random variables, their joint pmf is given as Px,y = ?(? + ? + 2)/(B + 2) for 0 ≤ X < 3, 0 ≤ Y < 3 Where B=2. a) Find the value of ? b) Find the marginal pmf of ? and ? c) Find conditional pmf of ? given ? = 2

SOLUTION REQUIRED WITH COMPLETE STEPS Let X and Y be discrete random variables, their joint pmf...

SOLUTION REQUIRED WITH COMPLETE STEPS Let X and Y be discrete random variables, their joint pmf is given as Px,y = ?(? + ? + 1)/(B + 1) for 0 ≤ X < 3, 0 ≤ Y < 3 (Where B=7) a) Find the value of ? b) Find the marginal pmf of ? and ? c) Find conditional pmf of ? given ? = 1

SOLUTION REQUIRED WITH COMPLETE STEPS Let X and Y be discrete random variables, their joint pmf...

SOLUTION REQUIRED WITH COMPLETE STEPS Let X and Y be discrete random variables, their joint pmf is given as Px,y = ?(? + ? − 2)/(B + 1) for 1 < X ≤ 4, 1 < Y ≤ 4 (Where B=2) a) Find the value of ? b) Find the marginal pmf of ? and ? c) Find conditional pmf of ? given ? = 3

A. (i) Consider the random variable X with pmf: pX (−1) = pX (1) = 1/8,...

A. (i) Consider the random variable X with pmf: pX (−1) = pX (1) = 1/8, pX (0) = 3/4. Show that the Chebyshev inequality P (|X − μ| ≥ 2σ) ≤ 1/4 is actually an equation for this random variable. (ii) Find the pmf of a different random variable Y that also takes the values {−1, 0, 1} for which the Chebyshev inequality P (|X − μ| ≥ 3σ) ≤ 1/9 is actually an equation.

(14pts) Let X and Y be i.i.d. geometric random variables with parameter (probability of success) p,...

(14pts) Let X and Y be i.i.d. geometric random variables with parameter (probability of success) p, 0 < p < 1. (a) (6pts) Find P(X > Y ). (b) (8pts) Find P(X + Y = n) and P(X = k∣X + Y = n), for n = 2, 3, ..., and k = 1, 2, ..., n − 1.

Let X and Y be discrete random variables, their joint pmf is given as ?(x,y)= ?(?...

Let X and Y be discrete random variables, their joint pmf is given as ?(x,y)= ?(? + ? − 2)/(B + 1) for 1 < X ≤ 4, 1 < Y ≤ 4 Where B is the last digit of your registration number ( B=3) a) Find the value of ? b) Find the marginal pmf of ? and ? c) Find conditional pmf of ? given ? = 3

Consider two random variable X and Y with joint PMF given in the table below. Y...

Consider two random variable X and Y with joint PMF given in the table below. Y = 2 Y = 4 Y = 5 X = 1 k/3 k/6 k/6 X = 2 2k/3 k/3 k/2 X = 3 k k/2 k/3 a) Find the value of k so that this is a valid PMF. Show your work. b) Re-write the table with the joint probabilities using the value of k that you found in (a). c) Find the marginal...

If X is binomially distributed with Binomial(3, 1/3) and Y|X = x ~ Geometric(1/(x+5)), What is...

If X is binomially distributed with Binomial(3, 1/3) and Y|X = x ~ Geometric(1/(x+5)), What is P(Y=1)? Var(Y)? E[1/e^Y|X=2]?

Let X be a discrete random variable with the range RX = {1, 2, 3, 4}....

Let X be a discrete random variable with the range RX = {1, 2, 3, 4}. Let PX(1) = 0.25, PX(2) = 0.125, PX(3) = 0.125. a) Compute PX(4). b) Find the CDF of X. c) Compute the probability that X is greater than 1 but less than or equal to 3.